Upload
others
View
3
Download
0
Embed Size (px)
Citation preview
Research Development and Consultancy Division Council for the Indian School Certificate Examinations
New Delhi
Analysis of Pupil Performance
MATHEMATICS
ICSE
Year 2019 __________________________________________________________________________________
Published by:
Research Development and Consultancy Division (RDCD)
Council for the Indian School Certificate Examinations Pragati House, 3rd Floor
47-48, Nehru Place
New Delhi-110019
Tel: (011) 26413820/26411706 E-mail: [email protected]
Β© Copyright, Council for the Indian School Certificate Examinations All rights reserved. The copyright to this publication and any part thereof solely vests in the Council for the Indian School Certificate Examinations. This publication and no part thereof may be reproduced, transmitted, distributed or stored in any manner whatsoever, without the prior written approval of the Council for the Indian School Certificate Examinations.
i
This document of the Analysis of Pupilsβ Performance at the ISC Year 12 and ICSE Year 10
Examination is one of its kind. It has grown and evolved over the years to provide feedback to
schools in terms of the strengths and weaknesses of the candidates in handling the examinations.
We commend the work of Mrs. Shilpi Gupta (Deputy Head) of the Research Development and
Consultancy Division (RDCD) of the Council and her team, who have painstakingly prepared this
analysis. We are grateful to the examiners who have contributed through their comments on the
performance of the candidates under examination as well as for their suggestions to teachers and
students for the effective transaction of the syllabus.
We hope the schools will find this document useful. We invite comments from schools on its
utility and quality.
Gerry Arathoon October 2019 Chief Executive & Secretary
FOREWORD
ii
The Council has been involved in the preparation of the ICSE and ISC Analysis of Pupil Performance documents since the year 1994. Over these years, these documents have facilitated the teaching-learning process by providing subject/ paper wise feedback to teachers regarding performance of students at the ICSE and ISC Examinations. With the aim of ensuring wider accessibility to all stakeholders, from the year 2014, the ICSE and the ISC documents have been made available on the Councilβs website www.cisce.org.
The documents include a detailed qualitative analysis of the performance of students in different subjects which comprises of examinersβ comments on common errors made by candidates, topics found difficult or confusing, marking scheme for each question and suggestions for teachers/ candidates.
In addition to a detailed qualitative analysis, the Analysis of Pupil Performance documents for the Examination Year 2019 also have a component of a detailed quantitative analysis. For each subject dealt with in the document, both at the ICSE and the ISC levels, a detailed statistical analysis has been done, which has been presented in a simple user-friendly manner.
It is hoped that this document will not only enable teachers to understand how their students have performed with respect to other students who appeared for the ICSE/ISC Year 2019 Examinations, but also provide information on how they have performed within the Region or State, their performance as compared to other Regions or States, etc. It will also help develop a better understanding of the assessment/ evaluation process. This will help teachers in guiding their students more effectively and comprehensively so that students prepare for the ICSE/ ISC Examinations, with a better understanding of what is required from them.
The Analysis of Pupil Performance document for ICSE for the Examination Year 2019 covers the following subjects: English (English Language, Literature in English), Hindi, History, Civics and Geography (History and Civics, Geography), Mathematics, Science (Physics, Chemistry, Biology), Commercial Studies, Economics, Computer Applications, Economic Applications, Commercial Applications.
Subjects covered in the ISC Analysis of Pupil Performance document for the Year 2019 include English (English Language and Literature in English), Hindi, Elective English, Physics (Theory), Chemistry (Theory), Biology (Theory), Mathematics, Computer Science, History, Political Science, Geography, Sociology, Psychology, Economics, Commerce, Accounts and Business Studies.
I would like to acknowledge the contribution of all the ICSE and the ISC examiners who have been an integral part of this exercise, whose valuable inputs have helped put this document together.
I would also like to thank the RDCD team of Dr. M.K. Gandhi, Dr. Manika Sharma, Mrs. Roshni George and Mrs. Mansi Guleria who have done a commendable job in preparing this document.
Shilpi Gupta October 2019 Deputy Head - RDCD
PREFACE
Page No.
FOREWORD i
PREFACE ii
INTRODUCTION 1
QUANTITATIVE ANALYSIS 3
QUALITATIVE ANALYSIS 10
CONTENTS
1
This document aims to provide a comprehensive picture of the performance of candidates in the subject. It comprises of two sections, which provide Quantitative and Qualitative analysis results in terms of performance of candidates in the subject for the ICSE Year 2019 Examination. The details of the Quantitative and the Qualitative analysis are given below.
Quantitative Analysis This section provides a detailed statistical analysis of the following:
Overall Performance of candidates in the subject (Statistics at a Glance) State wise Performance of Candidates Gender wise comparison of Overall Performance Region wise comparison of Performance Comparison of Region wise performance on the basis of Gender Comparison of performance in different Mark Ranges and comparison on the basis of Gender for
the top and bottom ranges Comparison of performance in different Grade categories and comparison on the basis of Gender
for the top and bottom grades
The data has been presented in the form of means, frequencies and bar graphs.
Understanding the tables
Each of the comparison tables shows N (Number of candidates), Mean Marks obtained, Standard Errors and t-values with the level of significance. For t-test, mean values compared with their standard errors indicate whether an observed difference is likely to be a true difference or whether it has occurred by chance. The t-test has been applied using a confidence level of 95%, which means that if a difference is marked as βstatistically significantβ (with * mark, refer to t-value column of the table), the probability of the difference occurring by chance is less than 5%. In other words, we are 95% confident that the difference between the two values is true.
t-test has been used to observe significant differences in the performance of boys and girls, gender wise differences within regions (North, East, South and West), gender wise differences within marks ranges (Top and bottom ranges) and gender wise differences within grades awarded (Grade 1 and Grade 9) at the ICSE Year 2019 Examination.
The analysed data has been depicted in a simple and user-friendly manner.
INTRODUCTION
2
Given below is an example showing the comparison tables used in this section and the manner in which they should be interpreted.
Qualitative Analysis The purpose of the qualitative analysis is to provide insights into how candidates have performed in individual questions set in the question paper. This section is based on inputs provided by examiners from examination centres across the country. It comprises of question wise feedback on the performance of candidates in the form of Comments of Examiners on the common errors made by candidates along with Suggestions for Teachers to rectify/ reduce these errors. The Marking Scheme for each question has also been provided to help teachers understand the criteria used for marking. Topics in the question paper that were generally found to be difficult or confusing by candidates, have also been listed down, along with general suggestions for candidates on how to prepare for the examination/ perform better in the examination.
Comparison on the basis of Gender
Gender N Mean SE t-value Girls 2,538 66.1 0.29 11.91* Boys 1,051 60.1 0.42
*Significant at 0.05 level
The table shows comparison between the performances of boys and girls in a particular subject. The t-value of 11.91 is significant at 0.05 level (mentioned below the table) with a mean of girls as 66.1 and that of boys as 60.1. It means that there is significant difference between the performance of boys and girls in the subject. The probability of this difference occurring by chance is less than 5%. The mean value of girls is higher than that of boys. It can be interpreted that girls are performing significantly better than boys.
The results have also been depicted pictographically. In this case, the girls performed significantly better than the boys. This is depicted by the girl with a medal.
3
QUANTITATIVE ANALYSIS
Total Number of Candidates: 1,88,415
Mean Marks:
66.8
Highest Marks: 100
Lowest Marks: 0
STATISTICS AT A GLANCE
4
80.8
64.045.2
73.065.8
75.158.7
78.067.8
74.264.3
62.270.871.4
61.679.0
49.757.2
56.563.663.9
76.462.5
74.249.2
72.267.5
60.463.6
66.364.4
ForeignAndhra Pradesh
Arunachal PradeshAssam
BiharChandigarh
ChhattisgarhGoa
GujaratHaryana
Himachal PradeshJharkhandKarnataka
KeralaMadhya Pradesh
MaharashtraManipur
MeghalayaNagaland
New DelhiOdisha
PuducherryPunjab
RajasthanSikkim
Tamil NaduTelangana
TripuraUttar Pradesh
UttarakhandWest Bengal
PERFORMANCE (STATE-WISE & FOREIGN)
The States/UTs of Maharashtra, Goa and Puducherry secured highest mean marks. Mean marks secured by candidates studying in
schools abroad were 80.8.
5
Comparison on the basis of Gender Gender N Mean SE t-value Girls 85,443 67.6 0.07 14.07* Boys 1,02,972 66.2 0.07
*Significant at 0.05 level
GIRLS
Mean Marks: 67.6
Number of Candidates: 85,443
BOYS
Mean Marks: 66.2
Number of Candidates: 1,02,972
GENDER-WISE COMPARISON
Girls performed significantly better than
boys.
6
REGION-WISE COMPARISON
Mean Marks: 63.8
Number of Candidates: 61,451
Highest Marks: 100Lowest Marks: 08
Mean Marks: 63.9
Number of Candidates: 65,229
Highest Marks: 100Lowest Marks: 0
Mean Marks: 70.0
Number of Candidates: 37,509
Highest Marks: 100Lowest Marks: 14
Mean Marks: 77.4
Number of Candidates: 23,819
Highest Marks: 100Lowest Marks: 01
East North
West South
Mean Marks: 80.8 Number of Candidates: 407 Highest Marks: 100 Lowest Marks: 18
Foreign
REGION
7
Mean Marks obtained by Boys and Girls-Region wise
64.7 64.171.2
78.3 80.5
63.4 63.568.8
76.781.2
North East South West Foreign
Comparison on the basis of Gender within Region Region Gender N Mean SE t-value
North (N) Girls 28,412 64.7 0.13 7.51* Boys 36,817 63.4 0.12
East (E) Girls 27,698 64.1 0.14 2.93* Boys 33,753 63.5 0.13
South (S) Girls 18,628 71.2 0.14 11.54* Boys 18,881 68.8 0.15
West (W) Girls 10,491 78.3 0.18 6.62* Boys 13,328 76.7 0.17
Foreign (F) Girls 214 80.5 1.28 -0.36 Boys 193 81.2 1.35 *Significant at 0.05 level REGION (N, E, S, W)
8
18.7
32.6
50.8
71.0
90.3
18.8
32.8
51.0
71.0
90.2
18.6
32.5
50.7
71.0
90.3
0 - 20
21 - 40
41 - 60
61 - 80
81 - 100
Boys Girls All Candidates
Comparison on the basis of gender in top and bottom mark ranges Marks Range Gender N Mean SE t-value Top Range (81-100) Girls 31,025 90.2 0.03 -2.90* Boys 36,111 90.3 0.03
Bottom Range (0-20) Girls 936 18.8 0.05 1.75 Boys 1797 18.6 0.04 *Significant at 0.05 level
MARK RANGES : COMPARISON GENDER-WISE
Marks Range (81-100)
Marks Range (81-100)
Marks Range (0-20)
9
18.7
24.1
37.2
47.5
56.6
66.6
75.6
84.7
94.4
18.8
24.2
37.3
47.6
56.6
66.6
75.6
84.7
94.4
18.6
24.1
37.2
47.5
56.6
66.6
75.6
84.7
94.5
9
8
7
6
5
4
3
2
1
Boys Girls All Candidates
Comparison on the basis of gender in Grade 1 and Grade 9 Grades Gender N Mean SE t-value Grade 1 Girls 16,808 94.4 0.02 -0.57 Boys 19,977 94.5 0.02
Grade 9 Girls 936 18.8 0.05 1.75 Boys 1797 18.6 0.04
GRADES AWARDED : COMPARISON GENDER-WISE
10
SECTION A (40 Marks) Attempt all questions from this Section.
Question 1
(a) Solve the following inequation and write down the solution set:
11π₯π₯ β 4 < 15π₯π₯ + 4 β€ 13π₯π₯ + 14, π₯π₯π₯π₯π₯π₯
Represent the solution on a real number line.
[3]
(b) A man invests `4500 in shares of a company which is paying 7.5% dividend.
If `100 shares are available at a discount of 10%.
Find:
(i) Number of shares he purchases.
(ii) His annual income.
[3]
(c) In a class of 40 students, marks obtained by the students in a class test (out of 10) are
given below:
Marks 1 2 3 4 5 6 7 8 9 10
Number of students 1 2 3 3 6 10 5 4 3 3
Calculate the following for the given distribution:
(i) Median
(ii) Mode
[4]
QUALITATIVE ANALYSIS
11
Comments of Examiners (a) Many candidates made errors in transposing like terms
on same side e.g., 15x β 11x<- 4 β 4 . Some candidates made mistakes in solving the inequation. Most of the errors were pertaining to positive and negative signs like, -4x < 8 β x < - 2
A number of candidates did not write down the solution set after solving the given inequation. Some did not use set notation method with curly brackets, and some represented as real number solution stating xβ R. Several candidates represented solution incorrectly on the number line i.e., XβN was considered as xβR. A few candidates failed to put extra number on each side of solution for indicating the continuity of the number line.
(b) (i) Common errors made by many candidates were in finding annual income, in considering Market Value (MV) i.e., instead of taking discounted MV as βΉ90 it was taken as either βΉ100 or βΉ110. Thus, made mistake in finding the number of shares purchased.
(ii) Annual income was also calculated incorrectly due to error in finding the number of shares.
(c) (i) A large number of the candidates were unable to understand that the given data is a non-grouped frequency distribution. To identify the median, instead of finding the cumulative frequency, they tried to find it directly. Some tried to find the median by plotting the points directly on a graph paper. Some candidates tried to find the median by writing all 40 numbers.
(ii) Several candidates could not identify mode correctly.
MARKING SCHEME Question 1 (a) 11π₯π₯ β 4 < 15π₯π₯ + 4 β€ 13π₯π₯ + 14, π₯π₯π₯π₯π₯π₯
11π₯π₯ β 4 < 15π₯π₯ + 4 15π₯π₯ + 4 β€ 13π₯π₯ + 14 11π₯π₯ β 15π₯π₯ < 4 + 4 15π₯π₯ β 13π₯π₯ β€ 14 β 4 β4π₯π₯ < 8 2π₯π₯ β€ 10 +4π₯π₯ > β8 π₯π₯ β€ 5 π₯π₯ > β2
Suggestions for teachers - Revise the concepts of number
system viz., Natural numbers (N), Whole numbers (W), Integers (Z), Real numbers (R) frequently.
- Give adequate practice for transpositions of variables and constants and division by negative number in inequations.
- Teach the method of writing the solution set in set notation form.
- Clarify the rules of representation of the solution on the number line whether it belongs to N, W, Z or R.
- Build the concept of Nominal Value (NV), Market Value (MV), dividend etc by giving examples.
- Discuss the Simple distribution, Non-grouped frequency distribution and Grouped frequency distribution in detail with corresponding method of measure of their central tendencies.
- Drill students with basic concepts like inequations, shares & dividends, median, mode and related application-based problems.
(Transforming x terms on one side and constants on the other side)
12
Solution: {0, 1, 2, 3, 4, 5}
(b) (i) Market value of each share = `100 β 10% of `100 = `90
β΄ Number of shares = 450090
= 50
(ii) Annual Income = 7.5Γ100Γ50100
= `375
(c)
Marks (x) No. of Students (f)
cf
1 1 1 2 2 3 3 3 6 4 3 9 5 6 15 6 10 25 7 5 30 8 4 34 9 3 37 10 3 40 Ζ© = 40
(i) Median = 6 (ii) Mode = 6
Question 2
(a) Using the factor theorem, show that (x β 2) is a factor of π₯π₯3 + π₯π₯2 β 4π₯π₯ β 4.
Hence factorise the polynomial completely.
[3]
(b) Prove that:
(cosecππ β sin ππ)(secππ β cosππ)(tanππ + cot ππ) = 1
[3]
13
(c) In an Arithmetic Progression (A.P.) the fourth and sixth terms are 8 and 14 respectively.
Find the:
(i) first term
(ii) common difference
(iii) sum of the first 20 terms.
[4]
Comments of Examiners (a) A large number of candidates did not use Remainder-
Factor Theorem to show that (x β 2) is a factor of the given polynomial. Few of them did not conclude the remainder to be equal to 0. In some scripts, errors were observed in division of the polynomial by (x β 2).
Many candidates expressed the final answer by separating the factors by comma instead of expressing them in the product form as (x β 2) (x+1) (x+2).
(b) Many candidates made mistakes in substituting the reciprocal relations for the trigonometric ratios given in the question for example, cosec ΞΈ is taken as1/ cos ΞΈ instead of 1/sin ΞΈ etc. while some candidates made mistakes in simplification of the expressions on the Left-Hand Side of the question. Some candidates made mistakes in using the identities like sin2 ΞΈ +cos2 ΞΈ = 1 correctly. Some expanded the whole expression and made mistakes in simplification and using standard identities.
(c) Some candidates did not know the basic concepts of Arithmetic Progression (A.P.). Many candidates tried to solve the sum by trial & error method and got the six terms, but the necessary working was incorrect. Few candidates without framing equations like a+3d = 8 and a+5d = 14, wrote d=3. Some candidates either used incorrect formulae or made errors in calculation. Therefore, they failed to get the value of the first term, common difference and sum of the first 20 terms correctly.
Suggestions for teachers - Clarify the factor theorem /
Remainder theorem thoroughly with examples.
- Advise students to write the factors in product form.
- Drilling of simple trigonometric identities to apply them appropriately in solving other identities.
- Insist upon showing working clearly.
- Teach the concept of the two series: Arithmetic Progression (AP) and Geometric Progression (GP) and their differences with different examples.
- Revise formulae for finding a term, common difference and summation of certain number of terms in Arithmetic Progression frequently.
14
MARKING SCHEME Question 2 (a) ππ(π₯π₯) = π₯π₯3 + π₯π₯2 β 4π₯π₯ β 4
ππ(2) = 23 + 22 β 4 Γ 2 β 4
= 8 + 4 β 8 β 4
= 0
β΄ π₯π₯ β 2 is a factor of ππ(π₯π₯)
π₯π₯ β 2 | π₯π₯3 + π₯π₯2 β 4π₯π₯ β 4 | π₯π₯2 + 3π₯π₯ + 2
π₯π₯3 β 2π₯π₯2
3π₯π₯2 β 4π₯π₯
3π₯π₯2 β 6π₯π₯
2π₯π₯ β 4
2π₯π₯ β 4 x
π₯π₯2 + 3π₯π₯ + 2 = (π₯π₯ + 1)(π₯π₯ + 2)
β΄ π₯π₯3 + π₯π₯2 β 4π₯π₯ β 4 = (π₯π₯ β 2)(π₯π₯ + 1)(π₯π₯ + 2)
(b) (cosecππ β sinππ)(secππ β cos ππ)(tanππ + cot ππ) = 1
πΏπΏπΏπΏπΏπΏ β οΏ½1
sin ππβ sinπποΏ½ οΏ½
1cos ππ
β cos πποΏ½ οΏ½sinππcosππ
+cosππsinππ
οΏ½
= οΏ½1 β sin2 ππ
sinπποΏ½ Γ οΏ½
1 β cos2 ππcos ππ
οΏ½οΏ½sin2 ππ + cos2 ππ
sinππ cos πποΏ½
=cos2 ππsin ππ
Γsin2 ππcosππ
Γ1
sinππ cos ππ
= 1 = π π πΏπΏπΏπΏ
15
(c) Let a be the first term and d the common difference
β΄a + 3d = 8 and a + 5d = 14 (i) Solving a = β1 (ii) d = 3
(iii) πΏπΏππ = ππ2
{2 Γ ππ + (ππ β 1) ππ}
πΏπΏ20 = 202
{2 Γ (β1) + (20 β 1) 3}
πΏπΏ20 = 10(β2 + 57)
πΏπΏ20 = 550
Question 3
(a) Simplify
sinπ΄π΄ οΏ½sinπ΄π΄ β cosπ΄π΄cosπ΄π΄ sinπ΄π΄ οΏ½ + cosπ΄π΄ οΏ½ cosπ΄π΄ sinπ΄π΄
β sinπ΄π΄ cosπ΄π΄οΏ½
[3]
(b) M and N are two points on the X axis and Y axis respectively. P (3, 2) divides the line segment MN in the ratio 2: 3. Find: (i) the coordinates of M and N (ii) slope of the line MN.
[3]
(c) A solid metallic sphere of radius 6 cm is melted and made into a solid cylinder of height 32 cm. Find the: (i) radius of the cylinder (ii) curved surface area of the cylinder Take Ο = 3.1
[4]
16
Comments of Examiners (a) Some candidates made mistakes in scalar multiplication
of the matrix. For Example, sin A οΏ½sinπ΄π΄ β cosπ΄π΄
cosπ΄π΄ sinπ΄π΄ οΏ½ = οΏ½ π π π π ππ2π΄π΄ sinπ΄π΄ β cosπ΄π΄sinπ΄π΄ cosπ΄π΄ π π π π ππ2π΄π΄
οΏ½
Some made errors in matrix addition and did not apply the identity sin2A+cos2A = 1 for simplifying the final matrix. A number of candidates put some specific value, e.g., 90Β°, 60Β° ππππππ and tried to solve the problem.
(b)(i) Several candidates made errors in identifying coordinates of points on x-axis and y-axis, e,g., (x,0) and (0,y) was taken as (0,x) , (y,0) or as (ππππ,ππππ) and (ππππ,ππππ).
Many candidates instead of using the given ratio ππππ:ππππ = 2: 3 took ππππ:ππππ = 2: 3.
Some candidates used midpoint formula to find coordinates of ππ. A number of candidates made calculation errors. Some overlooked the last part of the question and did not find slope of the line ππππ.
(ii) As some candidates obtained incorrect coordinates of M and N, they made error in finding the slope of the line MN. Some candidates were not conversant with the formula to find the slope of a line.
(c) (i) Some candidates used incorrect formula for finding the volume of a sphere and a cylinder, e.g., volume of sphere was taken as 4/3 Οr2 or 2/3 Οr3 and volume of cylinder was taken as 2Οr2h or ΟΓ62Γ32 instead of Οr2 32.Some candidates did not use the value of Ο given in the question paper, hence, got incorrect answer.
(ii) Many candidates used incorrect formula for finding curved surface area of the cylinder, e.g., used 2Οr2 h instead of 2Οrh.
MARKING SCHEME Question 3 (a) sinπ΄π΄ οΏ½sinπ΄π΄ β cosπ΄π΄
cosπ΄π΄ sinπ΄π΄ οΏ½ + cosπ΄π΄ οΏ½ cosπ΄π΄ sinπ΄π΄β sinπ΄π΄ cosπ΄π΄οΏ½
= οΏ½ sin2 π΄π΄ β sinπ΄π΄ cosπ΄π΄sinπ΄π΄ cosπ΄π΄ sin2 π΄π΄
οΏ½ + οΏ½ cos2 π΄π΄ cosπ΄π΄ sinπ΄π΄β sinπ΄π΄ cosπ΄π΄ cos2 π΄π΄
οΏ½
= οΏ½ sin2 π΄π΄ + cos2 π΄π΄ β sinπ΄π΄ cosπ΄π΄ + cosπ΄π΄ sinπ΄π΄sinπ΄π΄ cosπ΄π΄ β sinπ΄π΄ cosπ΄π΄ sin2 π΄π΄ + cos2 π΄π΄
οΏ½
= οΏ½1 00 1οΏ½
Suggestions for teachers - Give thorough practice of basic
operations like addition, multiplication of matrices and solving matrix equation.
- Instruct students to show each step of working and also to use matrix notation for each step.
- Advise students to read the question carefully and take note of every part to be attempted.
- Familiarise students with the logic of assigning coordinates to the points taken on the x-axis and on the y-axis.
- Teach students that if a point divides a line segment in the ratio m:n (m β n) then m: n is not equal to n: m.
- Give adequate practice to the students for application of various mensuration formulae of volume and surface area of solids.
- Give revision of volume and surface area related application-based problems to the students to clarify their concepts.
- Train students to handle carefully the operation of multiplication and division with decimal numbers.
17
(b) Let M(x, 0) and N(0,0) and N(0, y) be the two points on the X and Y axis respectively. (i) P(3, 2) divides MN in the ratio 2 : 3
β΄ 3 = 2Γ0+3Γπ₯π₯2+3
β΄ π₯π₯ = 5
2 = 2Γπ¦π¦+3Γ02+3
β΄ π¦π¦ = 5
M (5, 0), N(0, 5)
(ii) Slope of MN: 5β00β5
= β1
(c) Let the radius of the cylinder be βrβ
Volume of sphere = 43ππππ3 = 4
3Γ Ο Γ 63
Volume of cylinder = ππππ2β = ππ Γ ππ2 Γ 32
(i) β΄ 43ππ Γ 63 = ππ Γ ππ2 Γ 32
β΄ ππ2 = 4Γ63
3Γ32= 32
β΄ ππ = 3 ππππ
(ii) Curved surface area of cylinder= 2ππππβ
= 2 Γ 3.1 Γ 3 Γ 32
= 595.2 ππππ2
Question 4
(a) The following numbers, K + 3, K + 2, 3K β 7 and 2K β 3 are in proportion. Find K. [3]
(b) Solve for x the quadratic equation π₯π₯2 β 4 π₯π₯ β 8 = 0.
Give your answer correct to three significant figures.
[3]
(c) Use ruler and compass only for answering this question.
Draw a circle of radius 4 cm. Mark the centre as O. Mark a point P outside the circle
at a distance of 7 cm from the centre. Construct two tangents to the circle from the
external point P.
Measure and write down the length of any one tangent.
[4]
18
Suggestions for teachers - Advise students to read the question
carefully and apply the condition correctly as given in the problem.
- Train students to analyse a given question with what is given and what is to be evaluated.
- Acquaint students with the use of mathematical tables to get the value of β48 directly instead of wasting time to get the value using division method which is not necessary.
- Clarify significant figures thoroughly with relevant examples.
- Insist upon giving all traces of construction.
- Instruct students to read the construction-based question carefully and solve the problem as per its requirement.
Comments of Examiners (a) Some candidates did not use the property of
proportion correctly. Many candidates used arithmetic progression to solve the sum instead of ratio and proportion. A number of candidates used componendo and dividendo but their working was incorrect. Several candidates did not equate the expression k2 β 4k -5 to zero. A few candidates neglected the final answer 5 and -1.
(b) Many candidates used incorrect formula for finding roots of the quadratic equation. Some used correct formula but incorrect substitution, e.g., c = 8 instead of β 8. Many candidates could not express β48 as 4β3 and a few failed to substitute β3=1.732. Some candidates used long division method to find β48 and went wrong in calculation. Several candidates did not express the final answer up to three significant figures as it was asked in the question.
(c) Several candidates did not take distance OP = 7cm as it was given in the question. Many candidates marked midpoint of OP using ruler instead of constructing the perpendicular bisector. Some candidates followed some other incorrect methods for construction. A number of candidates measured the length of the tangent incorrectly. Some candidates wasted time in writing the steps of construction which was not asked in the question.
MARKING SCHEME Question 4 (a) πΎπΎ + 3,πΎπΎ + 2, 3πΎπΎ β 7 and 2πΎπΎ β 3 are in proportion
β΄ πΎπΎ + 3πΎπΎ + 2
=3πΎπΎ β 72πΎπΎ β 3
Or (πΎπΎ + 3)(2πΎπΎ β 3) = (3πΎπΎ β 7)(πΎπΎ + 2)
2πΎπΎ2 + 6πΎπΎ β 3πΎπΎ β 9 = 3πΎπΎ2 β 7πΎπΎ + 6πΎπΎ β 14
πΎπΎ2 β 4πΎπΎ β 5 = 0
(πΎπΎ β 5)(πΎπΎ + 1) = 2
β΄ πΎπΎ = 5,β1 (b) π₯π₯2 β 4π₯π₯ β 8 = 0
π₯π₯ =β(β4) Β± οΏ½(β4)2 β 4.1. (β8)
2 Γ 1
19
=4 Β± β16 + 32
2
=4 Β± β48
2
=4 Β± 4β3
2
= 2 Β± 2β3 = 2 Β± 2 Γ 1.732
π₯π₯ = 2 Β± 3.464
β΄ π₯π₯ = 5.464 ππππ β 1.464
π₯π₯ = 5.46,β1.46 (Correct to three significant figures.) (c) Circle and point P
Bisecting OP and drawing circle Two tangents
PS = PT = (5.7 Β± 0.2) cm
20
SECTION B (40 Marks) Attempt any four questions from this Section
Question 5
(a) There are 25 discs numbered 1 to 25. They are put in a closed box and shaken
thoroughly. A disc is drawn at random from the box.
Find the probability that the number on the disc is:
(i) an odd number
(ii) divisible by 2 and 3 both.
(iii) a number less than 16.
[3]
(b) Rekha opened a recurring deposit account for 20 months. The rate of interest is 9% per
annum and Rekha receives `441 as interest at the time of maturity.
Find the amount Rekha deposited each month.
[3]
(c) Use a graph sheet for this question.
Take 1 cm = 1 unit along both x and y axis.
(i) Plot the following points:
A(0,5), B(3,0), C(1,0) and D(1,β5)
(ii) Reflect the points B, C and D on the y axis and name them as B', C' and D'
respectively.
(iii) Write down the coordinates of B', C' and D'.
(iv) Join the points A, B, C, D, D', C', B', A in order and give a name to the closed figure
ABCDD'C'B'.
[4]
21
Comments of Examiners (a) (i) Common errors noticed in sub parts (i) ,(ii) and
(iii) of this question were: β’ total outcome or favourable outcome was
incorrect in all parts. β’ favourable outcome of odd numbers was
taken as 13. β’ numbers divisible by 2 and 3 both were listed
incorrectly. Many candidates misread the condition as 2 or 3. Hence, favorable outcomes was 16 instead of 4.
β’ the probability was not expressed in the simplest form, e.g., 15/25 was not written as 3/5.
(b) Some candidates considered βΉ441 as maturity value and some considered it as monthly installment instead of taking it as interest. Many candidates either used incorrect formula or made errors in calculation.
(c) Following anomalies were observed in the solution of graph-based question: β’ incorrect choice of scale i.e., 2cm = 1unit instead
of 1cm = 1unit as it was given in the question paper.
β’ marked axes incorrectly. β’ plotted A (0,5), B (3,0) and C(1,0) incorrectly. β’ plotted the points correctly but did not label them. β’ neither join the points nor completed the figure. β’ reflected points Bβ, Cβ, and Dβ were marked incorrectly. β’ coordinates of Bβ, Cβ, and Dβ were not written correctly. β’ did not name the closed figure as given in the question.
MARKING SCHEME
Question 5 (a) Total number of outcomes = 25
(i) favourable outcomes are {1, 3, 5, 7, 11, 13, 15, 17, 19, 21, 23, 25} β΄ probability of being an odd number is = 12
25
(ii) favourable outcomes are {6, 12, 18, 24} i.e. 4 β΄ probability of being divisible by both 2 and 3 is = 4
25
(iii) favourable outcomes are {1, 2, 3, 4, 5β¦15}, i.e. 15 β΄ probability = 15
25= 3
5
Suggestions for teachers - Instruct students to list the outcomes
of both total and favourable events. - Concept of AND, OR in finding the
probability of a number on the disc divisible by 2 and 3 or 2 or 3 require more drilling.
- In probability, emphasise in giving answers in the simplest form.
- Instruct students to read the question carefully so as not to go wrong with given data.
- More drilling of calculation based sums minimise calculation errors.
- Formulae for finding the monthly installment, MV or number of months need repeated drilling.
- Candidates must be instructed to read each part carefully for a question on reflection.
- More practice required on problems leading to Graphs with proper choice of axis.
- Give adequate practice to the students to identify points on the x and y axis in the class.
22
(b) Let monthly deposit be ` x
Interest = ππΓππ(ππ+1)Γππ100Γ2Γ12
441 =π₯π₯ Γ 20(20 + 1) Γ 9
100 Γ 2 Γ 12
63π₯π₯40
= 441
β΄ x = `280
(c)
(iii) B(3, 0) π¦π¦βπππ₯π₯ππππ οΏ½β―β―β―β―β―οΏ½ B'(β3, 0)
C(1, 0) π¦π¦βπππ₯π₯ππππ οΏ½β―β―β―β―β―οΏ½ C'(β1, 0)
D(1, β5) π¦π¦βπππ₯π₯ππππ οΏ½β―β―β―β―β―οΏ½ D'(β1, β5)
(iv) Arrow Head / Heptagon(or Septagon)
Equating interest to 441
Plotting A, B, C, D
Reflected points B',C',D'
23
Question 6
(a) In the given figure, β PQR = β PST = 90o, PQ = 5 cm and PS = 2 cm.
(i) Prove that βPQR ~ βPST.
(ii) Find Area of βPQR: Area of quadrilateral SRQT.
[3]
(b) The first and last term of a Geometrical Progression (G.P.) are 3 and 96 respectively. If the
common ratio is 2, find:
(i) βnβ the number of terms of the G.P.
(ii) Sum of the n terms.
[3]
(c) A hemispherical and a conical hole is scooped out of a solid wooden cylinder. Find the
volume of the remaining solid where the measurements are as follows:
The height of the solid cylinder is 7 cm, radius of each of hemisphere, cone and cylinder is
3 cm. Height of cone is 3 cm.
Give your answer correct to the nearest whole number. Take Ο =227
.
[4]
24
Suggestions for teachers - Build up the concept of similarity of
triangles and related results by giving adequate practice and frequent class tests.
- Advise students to write down the proportional sides after proving similarity.
- Instruct students to read the question carefully and underline the points to be answered and the correct form of the answer.
- Advise students to understand the formulae related to sequence and series with reference to the context and use them to solve the problems by following the correct method and clearly showing all steps of working.
- Train students to calculate the volume of a remaining solid by putting all the volumes in a combine manner with plus and minus sign instead of calculating each volume separately.
- Give sufficient practice in problems based on volume and surface area of different solids.
- Read the question carefully and use the given value of Ο. Use Ο = 22/7 in such sums unless otherwise if it is mentioned.
- More drilling of such sums could rectify the calculation errors.
Comments of Examiners
(a) (i) Many candidates could not identify the two sets of equal angles to prove βPQR ~ βPST
(ii) Several candidates made mistake in writing (βPQR)/βPST=25/4. Hence, could not find
area of βPQR: area of quadrilateral β‘SRQT. Some candidates left the answer as 25/21 instead
of writing 25:21 as mentioned in the Question. (b) (i) A number of candidates were unable to form the
equations with given conditions. Due to cconceptual errors related to Geometrical Progression many candidates were unable to find the value of n. Some tried to find n by trial and error method.
(ii) Many candidates could not find the value of n but found the sum by using S=(lr-a)/(r-1) and got the correct answer.
Some candidates used incorrect formula for finding the sum of n terms.
(c) Some candidates made mistakes in applying the correct formula of one or more of solids (cylinder, hemisphere and cone) while a few made mistakes in substitution of values of radius and height of the solid/s scooped out of the cylinder. Some candidates took the value of Ο = 3.14 for calculation instead of the given value 22/7. A few candidates made mistakes in rounding of the answer to the nearest whole number. Basic calculation errors were also noticed in many answers scripts.
25
MARKING SCHEME Question 6 (a)
(i) In βPQR and βPST
β PQR = β PST = 90o (given)
β P is common to both triangles.
β΄βPQR ~ βPST (AAA)
(ii) β΄βPQR: βPST = 52: 22
β΄βPQR: quadrilateral SRQT = 25: 21
(b) 1st term a = 3 and last term = 96, r = 2
β΄Tn = 96 = a rnβ1
96 = 3 Γ 2nβ1 32 = 2nβ1
25 = 2nβ1
β΄nβ1 = 5 hence n = 6
πΏπΏ6 =ππ(ππππ β 1)ππ β 1
=3(26 β 1)
2 β 1 = 3(64 β 1) = 3 Γ 63 = 189
(c) Remaining volume = Volume of Cylinder β (volume of cone + volume of hemisphere)
= ππππ2β β οΏ½13ππππ2β +
23ππππ3οΏ½
=227
Γ 32 Γ 7 β οΏ½13
Γ227
Γ 32 Γ 3 +23
Γ227
Γ 33οΏ½
=227
Γ 32[7 β (1 + 2)]
=227
Γ 32 Γ 4 = 792
7= 113.1 = 113 ππππ3
26
Question 7
(a) In the given figure AC is a tangent to the circle with centre O.
If β ADB = 55o, find x and y. Give reasons for your answers.
[3]
(b) The model of a building is constructed with the scale factor 1 : 30.
(i) If the height of the model is 80 cm, find the actual height of the building in meters.
(ii) If the actual volume of a tank at the top of the building is 27 m3, find the volume of
the tank on the top of the model.
[3]
(c) Given οΏ½ 4 2β1 1οΏ½ππ = 6 πΌπΌ, where M is a matrix and I is unit matrix of order 2x2.
(i) State the order of matrix M.
(ii) Find the matrix M.
[4]
27
Comments of Examiners (a) Some candidates were unable to identify β BAD=90Β°
in the given figure. Hence, could not find β ABD, thereby got incorrect answers of x and y.
A number of candidates considered OADE as a cyclic quadrilateral and hence went wrong with the sum.
Many candidates solved the question without giving proper reasoning.
In some scripts simple calculation errors were also observed.
(b) Many candidates were not clear about the scale factor. A number of candidates made calculation errors. A few candidates made mistakes in unit conversion i.e., cm to m and cm3 to m3 for example took 2400 cm = 240 m and 100 cm3 = 0.001 m3.
A few of them left the answer in proper fraction as 1/1000 without any unit and some left answer to subpart (ii) as 1000 without any unit.
(c) (i) Some candidates were unable to find the order of the matrix.
Many were not aware that the matrix multiplication is not commutative and changed matrix M from right side in the given question to left side
π π . ππ. , οΏ½ 4 2β1 1οΏ½ππ = 6πΌπΌ to ππ οΏ½ 4 2
β1 1οΏ½ = 6πΌπΌ
Some took the identity matrix as οΏ½0 11 0οΏ½ instead
of οΏ½1 00 1οΏ½
(ii) Several candidates could not find the matrix multiplication correctly. Some candidates made mistake in framing the simultaneous equations and some could not find the values of the unknowns. A few got the values of the unknowns but did not arrange them in a matrix form.
Suggestions for teachers - Exhaustive drill of properties of
circle theorems and on application-based sums is must.
- Train students to give reasons supporting the answers while solving geometry-based questions.
- Teach students to name the angles with three letters, specifically when there are two or more angles at the same point, e.g., β OED must not be named as β E as it may mean β CED or β OEB or β BEC.
- Give sufficient practice of application-based problems on size transformation and proportionality.
- Intensive drill in conversion of units is must.
- Explain the concept of area, proportional to square of sides and concept of volume proportional to cube of sides.
- Instruct students to show each step of matrix multiplication.
- Ensure that enough practice is given in solving simultaneous equations.
- Train students to solve the sums involving identity matrix.
28
MARKING SCHEME Question 7 (a)
AC is a tangent and OA is the radius. β΄β BAC = 90o In βABD β BAD = 90o β΄β B = 180o β (90o + 55o) = 35o (angles of a triangle adds upto 180o) β y = 2β B β΄y = 2 Γ 35o = 70o (angle at the centre is double the angle in the remaining circumference) In βAOC x = 180o β (90o + y) =180o β (90o + 70o) = 20o (angles of a triangle adds upto 180o)
(b)
K = 130
(i) Height of model = 130
Γ Actual height of the building
= 30 Γ 80 cm = Actual height of the building Actual height of the building = 2400 cm = 24 m
OR 1: 30 = 80 : x (where x is the actual height of the building)
β΄ x = 2400 cm = 24 m.
Used correctly in height or volume
29
(ii) Volume of the tank on the top of the model
= οΏ½1πποΏ½3 Γ Actual volume of tank at the top of the building
= 1Γ2730Γ30Γ30
m3
= 27Γ100Γ100Γ10030Γ30Γ30
cm3
= 1000 cm3
(c) (i) (2Γ 2)(mΓ ππ)= (2Γ 2)β order of matrix, M = (2Γ 2)
(ii) οΏ½ 4 2β1 1οΏ½ Γ οΏ½ππ ππ
ππ πποΏ½ = 6 οΏ½1 00 1οΏ½
οΏ½4ππ + 2ππ 4ππ + 2ππβ ππ + ππ β ππ + πποΏ½ = οΏ½6 0
0 6οΏ½
4ππ + 2ππ = 6
βππ + ππ = 0
β΄ ππ = 1 ππππππ ππ = 1
4ππ + 2ππ = 0
β ππ + ππ = 6
β΄ ππ = β2 ππππππ ππ = 4
β΄ ππ = οΏ½1 β21 4 οΏ½
Question 8
(a) The sum of the first three terms of an Arithmetic Progression (A.P.) is 42 and the product
of the first and third term is 52. Find the first term and the common difference.
[3]
(b) The vertices of a βABC are A(3, 8), B(β1, 2) and C(6, β6). Find:
(i) Slope of BC.
(ii) Equation of a line perpendicular to BC and passing through A.
[3]
(c) Using ruler and a compass only construct a semi-circle with diameter BC = 7cm. Locate
a point A on the circumference of the semicircle such that A is equidistant from B and C.
Complete the cyclic quadrilateral ABCD, such that D is equidistant from AB and BC.
Measure β ADC and write it down.
[4]
30
Comments of Examiners (a) Many candidates took a-d, a and a+d as three terms of
Arithmetic Progression and found a=14 but while answering considered a as the first term instead of a-d.
A number of candidates did not write d=Β±12 but took d= +12 and hence found only one set of values.
Some candidates could not form the correct equation with the given data.
(b) Many candidates found the slope of the line BC correctly but failed to find the slope of a line perpendicular to BC. Some candidates found the midpoint of BC and used it to find the equation.
Many candidates did not express the equation in the simplified form. In many scripts, calculation errors were also observed.
(c) Concept of Locus was not clear to some candidates. Many candidates did not show the necessary traces of
construction. Midpoint of BC was not located by construction instead used ruler. Some were unable to identify the point A as the intersection of perpendicular bisector and semi-circle.
A number of candidates failed to bisect β ABC to locate point D on the semicircle.
MARKING SCHEME Question 8 (a) Let the terms be a β d, a, a + d
β΄ a β d + a + a β d = 42 3a = 42 β΄ a = 14 (a β d)(a + d) = 52 142 β d2 = 52 d2 = 196 β 52 d2 = 144 β΄d = Β±12 d = 12, or β12
Suggestions for teachers - Teach basic concepts of series in
detail in the class. - While taking square root of a
number discuss the reason of taking values both with positive and negative signs unless otherwise specified in the question.
- Clarify the concept of slope of a line, equation of a line perpendicular or parallel to a given line in detail.
- Give rigorous practice on the content of coordinate geometry.
- Instruct students to be careful with positive and negative signs during simplification of equations.
- Give enough practice in problems based on geometry.
- Train students to practise constructions using ruler and compass only, unless otherwise specified in the question.
- Instruct students to show all necessary traces of construction clearly.
31
(b) A(3, 8), B(β1, 2) and C(6, β6) (i) Slope of line BC = β6β2
6+1= β8
7
(ii) Slope of line perpendicular to BC is 78; Line passing through A(3, 8)
Equation is: π¦π¦ β 8 = 7
8(π₯π₯ β 3)
8π¦π¦ β 64 = 7π₯π₯ β 21 7π₯π₯ β 8π¦π¦ + 43 = 0
(c) β ADC = 135Β°
Question 9
(a) The data on the number of patients attending a hospital in a month are given below. Find
the average (mean) number of patients attending the hospital in a month by using the
shortcut method.
Take the assumed mean as 45. Give your answer correct to 2 decimal places.
Number of patients 10 β 20 20 β 30 30 β 40 40 β 50 50 β 60 60 β 70
Number of Days 5 2 7 9 2 5
[3]
32
(b) Using properties of proportion solve for x, given
β5π₯π₯ + β2π₯π₯ β 6β5π₯π₯ β β2π₯π₯ β 6
= 4
[3]
(c) Sachin invests `8500 in 10%, `100 shares at `170. He sells the shares when the price of
each share rises by `30. He invests the proceeds in 12% `100 shares at `125. Find:
(i) the sale proceeds.
(ii) the number of `125 shares he buys.
(iii) the change in his annual income.
[4]
Comments of Examiners (a) Following errors were observed in this question:
β’ Class mark was incorrect. β’ Assumed mean was not taken as 45 as it was given
in the question. β’ Some candidates did not use the short-cut method to
find the mean. β’ A very common error was 121Γ·3 was written as
4.33 instead of 40.33. (b) Many candidates made errors in applying Componendo
and Dividendo especially in the denominator of Left-Hand Side. Some candidates applied properties of proportion only on one side. Several candidates made mistake in squaring the expression 2β5π₯π₯
2β2π₯π₯β6= 5
3
(c) (i) Many candidates took sale price of the share as βΉ130 instead of βΉ200, Hence, answer to number of shares was incorrect. Calculation errors were also observed in many scripts.
(ii) Many candidates could not find the correct answer for number of shares he bought due to error in calculating the sale proceeds.
(iii) Error was also observed in the change in annual income due to incorrect value of number of shares.
Suggestions for teachers - Advise students to read the question
carefully and keep in mind the known and unknown data e.g., assumed mean =45, use short-cut method to find the mean, express your answer correct to 2 decimal places etc.
- Adequate practise of problems based on computation of mean must be given.
- Give more drill to avoid error in calculation.
- Revise frequently the problems on Ratio and Proportion.
- Show all steps of using properties of proportion in the solution of a problem clearly.
- Explain exhaustively the terms related to Share and Dividends- market value, face/nominal value, dividend etc thoroughly with examples.
33
MARKING SCHEME
Question 9 (a) C.I f mid-value d fd
10 - 20 5 15 -30 -150
20 - 30 2 25 -20 -40
30 - 40 7 35 -10 -70
40 - 50 9 45 0 0
50 - 60 2 55 10 20
60 - 70 5 65 20 100
30
-140
Given assumed mean (A) = 45
Mean = 45 + οΏ½β140
30οΏ½
= 45 β 4.67 = 40.33
(b) β5π₯π₯ + β2π₯π₯ β 6β5π₯π₯ β β2π₯π₯ β 6
= 4
β5π₯π₯+β2π₯π₯β6+β5π₯π₯ββ2π₯π₯β6β5π₯π₯+β2π₯π₯β6ββ5π₯π₯+β2π₯π₯β6
= 4+14β1
Applying componendo and dividendo
2β5π₯π₯2β2π₯π₯ β 6
=53
Squaring both sides 5π₯π₯
2π₯π₯ β 6=
259
45π₯π₯ = 50π₯π₯ β 150
5π₯π₯ = 150
β΄ π₯π₯ = 30
(c) Number of shares = 8500170
= 50
Dividend = 50Γ100Γ10100
= `500 (i) Sales proceeds = 50 Γ(170+30) = `10,000 (ii) New number of shares = 10,000
125 = 80
Dividend from new shares = 80Γ100Γ12100
= `960 β΄ Change in income = 960 β 500 = `460
34
Suggestions for teachers - Teach the students to cross-check
the cumulative frequency found. This is by tallying the total frequency with the last value of C.F.
- Correct choice of axis and scale require additional attention.
- Ensure that sufficient practice is given in drawing Ogive.
- Instruct students to indicate on the graph sheet to locate values from the graph.
- Advise students to draw Ogive - a cumulative frequency curve as a free hand curve. Points must not be joined with a ruler.
- Give sufficient practice of drawing correct diagrams for problems based on Heights and Distances.
Question 10
(a) Use graph paper for this question.
The marks obtained by 120 students in an English test are given below:
[6]
Marks 0β10 10β20 20β30 30β40 40β50 50β60 60β70 70β80 80β90 90β100
No. of
students 5 9 16 22 26 18 11 6 4 3
Draw the ogive and hence, estimate: (i) the median marks. (ii) the number of students who did not pass the test if the pass percentage was 50. (iii) the upper quartile marks.
(b) A man observes the angle of elevation of the top of the tower to be 45o. He walks towards it in a horizontal line through its base. On covering 20 m the angle of elevation changes to 60o. Find the height of the tower correct to 2 significant figures.
[4]
Comments of Examiners (a) (i) A number of candidates made mistakes in finding
the cumulative frequency though the total frequency was given correctly.
Some candidates drew the ogive with respect to lower boundaries and corresponding cumulative frequency instead of taking upper boundaries. Some candidates drew the ogive taking mid-values and corresponding cumulative frequency. To locate the various results from the graph indicating guidelines were not shown. Several candidates formed the S-curve by joining the points with ruler instead of free hand curve.
In sub parts (ii) and (iii) some candidates made mistakes in finding median marks, upper quartile marks and number of students who did not pass the test.
(b) The errors observed in this question were as follows: β’ Many candidates drew incorrect diagram. β’ Some candidates wrote incorrect ratio for tan ΞΈ.
35
- Instruct students to learn the skill to find T-ratios of standard angles mathematical tables instead of using.
- Advise students read the question carefully to give the answer in the required form.
- Advice students to practice mathematical calculations each day to reduce calculation errors.
β’ Many calculation errors were observed in the scripts because of taking tan 60Β° =1.732 instead of βππ .
In several answer scripts height of tower was not expressed correct to 2 significant figures as it was asked in the question.
MARKING SCHEME Question 10 (a) C.I. F C.F.
0 β 10 5 5 10 β 20 9 14 20 β 30 16 30 30 β 40 22 52 40 β 50 26 78 50 β 60 18 96 60 β 70 11 107 70 β 80 6 113 80 β 90 4 117 90 β 100 3 120
SCALE: On X-axis, 1 cm = 20 marks
On Y-axis, 1 cm = 20 students (i) Median = 43 marks (ii) Number of students who did not pass the test 78 (iii) 56 marks
(Β±1)
36
(b) tan 45ππ = π¦π¦π₯π₯+20
{ tan 45Β° = 1 }
1 =π¦π¦
π₯π₯ + 20
β΄ π₯π₯ + 20 = π¦π¦ y β 20 = x
tan 60 = π¦π¦π₯π₯ { tan 60Β° = β3}
π₯π₯ β3 = π¦π¦
x = y/ β3
y β 20 = y/ β3
β΄ π¦π¦ = 20οΏ½β3οΏ½οΏ½β3β1οΏ½
, π¦π¦ = 20οΏ½β3οΏ½οΏ½β3+1οΏ½οΏ½β3β1οΏ½οΏ½β3+1οΏ½
π₯π₯ =20(1.732 + 3)
3 β 1
π₯π₯ = 10 Γ 4.732
= 47.32 m
37
Suggestions for teachers - Instruct students to read the question
heedfully and analyse the given conditions before solving the problem.
- Stress upon solving sums using given conditions only.
- Give adequate practice in solving β’ problems based on Remainder-
Factor theorem and β’ word problems based on
quadratic equation. - Clarify to the students about the
consecutive numbers with different conditions like multiples of 3 with examples.
- Give ample practice to solve quadratic equation.
Question 11
(a) Using the Remainder Theorem find the remainders obtained when
x3 + (kx + 8)x + k is divided by x + 1 and x β 2.
Hence find k if the sum of the two remainders is 1.
[3]
(b) The product of two consecutive natural numbers which are multiples of 3 is equal to 810.
Find the two numbers.
[3]
(c) In the given figure, ABCDE is a pentagon inscribed in a circle such that AC is a diameter
and side BC//AE. If β BAC = 50Β°, find giving reasons:
(i) β ACB
(ii) β EDC
(iii) β BEC
Hence prove that BE is also a diameter
[4]
Comments of Examiners (a) Many candidates could not apply the Remainder
theorem correctly. Due to incorrect substitution or incorrect working
some candidates found the incorrect remainder. several candidates instead of adding the two
remainders, equated each remainder to zero that is 5k+24 = 0 and 2k- 9 =0.
(b) The most common error noticed in several scripts was in taking two consecutive natural numbers which were multiples of 3.
Some candidates made mistakes in forming the equation with the given conditions.
Few candidates made errors in solving the quadratic equation.
(c) (i) Following errors were observed in this question: β’ Some candidates could not apply the
appropriate property of circle theorem to find out the unknown angles.
38
- Teach circles and related angle properties, cyclic properties, tangent and secant properties thoroughly.
- Train students to write correct reasons in support of the working of geometry based questions to obtain the answers.
β’ Some failed to locate angles in the same segment hence could not prove β BEC=β BAC=50Β°
β’ Properties of cyclic quadrilateral were not applied.
β’ Many candidates even after solving the other parts could not prove BE is a diameter giving proper reasons. Unable to find the values of β ACB, β EDC and β BEC giving appropriate reasons.
MARKING SCHEME Question 11 (a) π₯π₯3 + (πππ₯π₯ + 8)π₯π₯ + ππ = π₯π₯3 + πππ₯π₯2 + 8π₯π₯ + ππ
When divided by π₯π₯ + 1
Remainder = (β1)3 + ππ(β1)2 + 8(β1) + ππ
= β1 + ππ β 8 + ππ
= 2ππ β 9
When divided by π₯π₯ β 2
Remainder = (2)3 + ππ(2)2 + 8(2) + ππ
= 8 + 4ππ + 16 + ππ
= 5ππ + 24
Hence 2ππ β 9 + 5ππ + 24 = 1
7ππ + 15 = 1
7ππ = β14
β΄ ππ = β2 (b) π΄π΄π π π π π΄π΄ππππ ππβππππ πππ‘π‘ππ πππππππ π πππππ΄π΄πππ π ππππ πππππππ΄π΄ππππππ πππ΄π΄πππππππππ π π‘π‘βπ π ππβ ππππππ πππ΄π΄πππππ π πππππππ π ππππ 3 ππππππ
π₯π₯ ππππππ π₯π₯ + 3
π₯π₯(π₯π₯ + 3) = 810
π₯π₯2 + 3π₯π₯ = 810
π₯π₯2 + 3π₯π₯ β 810 = 0 (π₯π₯ + 30)(π₯π₯ β 27) = 0
π₯π₯ = β30 ππππ π₯π₯ = 27
ππβππππππππππππππ, ππβππ πππ‘π‘ππ πππ΄π΄πππππππππ π ππππππ 27 ππππππ 30.
39
(c) (i) In βπ΄π΄π΄π΄π΄π΄,β π΄π΄π΄π΄π΄π΄ = 90Β° (π΄π΄πππ΄π΄ππππ π π ππ ππ π π πππππ π πππ π ππππππππ)
β π΄π΄π΄π΄π΄π΄ = 50Β° (π΄π΄π π ππππππ)
β΄ β π΄π΄π΄π΄π΄π΄ = 40Β°
(ii) β΅ AE//BC
β΄ β π΄π΄π΄π΄πΆπΆ = β π΄π΄π΄π΄π΄π΄ = 40Β° (πππππ π ππ ππππ ππππππππππππππππππ β π π ) In cyclic quadrilateral ACDE
β π΄π΄π΄π΄πΆπΆ + β πΆπΆπΈπΈπ΄π΄ = 180Β° (πππππππππ π π π ππππ β π π ππππ πππ¦π¦πππππ π ππ πππ΄π΄πππππππ π ππππππππππππππ ππππππ π π π΄π΄πππππππππππππππππππππ¦π¦. )
40Β° + β πΆπΆπΈπΈπ΄π΄ = 180Β°
β πΆπΆπΈπΈπ΄π΄ = 140Β°
(iii) β π΄π΄πΆπΆπ΄π΄ = β π΄π΄π΄π΄π΄π΄ = 50Β° (angles in the same segment)
(iv) β π΄π΄πΆπΆπ΄π΄ = 90 β 50 = 40Β°
β΄ β πΆπΆπ΄π΄π΄π΄ = 40Β° (alternate angles)
β΄ β πΆπΆπ΄π΄π΄π΄ = 90Β°
β΄ π΄π΄πΆπΆ is a diameter.
Note: For questions having more than one correct answer/solution, alternate correct answers/solutions, apart from those given in the marking scheme, have also been accepted.
40
GENERAL COMMENTS
.
β’ Prove trigonometrical identities by starting from left hand side and then proving it equal to right hand side or vice a versa.
β’ Write reasons while solving Geometry problems. β’ Use mathematical tables to find square root, cube root of a number etc. to save
time. β’ Recheck the calculation to avoid calculation error. β’ Be careful in conversion of units. β’ Utilise reading time must be used judiciously to make the right choice of questions. β’ Practise rounding off answers correct to required number of decimal places. β’ Practise significant figures and express the answer up to asked digits in the
question. β’ Show clearly all steps of working including rough work on the same answer sheet. β’ Show clearly all traces of construction while working with Geometrical
Constructions. β’ Practise thoroughly all formulae related to Coordinate geometry, mensuration etc.
Suggestions for
candidates
β’ Linear inequation and representation β’ Shares and Dividend β’ Rationalization β’ Algebraic division of polynomials by binomial and simplification. β’ Rounding off answers to the desired form. β’ Significant figures β’ Arithmetic and Geometrical Progression β’ Section formula and points on x and y axes β’ Properties of Ratio and Proportion β’ Geometry constructions β’ Trigonometry β’ Matrix- scalar multiplication and multiplication of 2 Matrices β’ Graphs β Axes and choice of scale β’ Size Transformation β’ Mensuration formula β’ Circle theorems β’ Statistics- Calculation of Central tendency of non-grouped frequency distribution β’ Calculation of Mean by Short-cut Method β’ Remainder-Factor theorem β’ Solving Geometry problems on circles and similar triangles using the appropriate
property
Topics found
difficult /confusing by
candidates